596
个编辑
更改
跳到导航
跳到搜索
第85行:
第85行: − 单项式标度不变性的概念在高维时推广到齐次多项式,更一般地推广到齐次函数。齐次函数是射影空间的“土著”,齐次多项式在射影几何中作为射影簇进行研究。射影几何是数学中一个内容特别丰富的领域;在它最抽象的形式,方案的几何学中,它与弦理论中的各种主题都有联系。+ − + − + − − −
→Projective geometry 射影几何
The idea of scale invariance of a monomial generalizes in higher dimensions to the idea of a homogeneous polynomial, and more generally to a homogeneous function. Homogeneous functions are the natural denizens of projective space, and homogeneous polynomials are studied as projective varieties in projective geometry. Projective geometry is a particularly rich field of mathematics; in its most abstract forms, the geometry of schemes, it has connections to various topics in string theory.
The idea of scale invariance of a monomial generalizes in higher dimensions to the idea of a homogeneous polynomial, and more generally to a homogeneous function. Homogeneous functions are the natural denizens of projective space, and homogeneous polynomials are studied as projective varieties in projective geometry. Projective geometry is a particularly rich field of mathematics; in its most abstract forms, the geometry of schemes, it has connections to various topics in string theory.
单项式标度不变性的概念在高维时推广到齐次多项式,更一般地推广到齐次函数。齐次函数是射影空间的“土著”,齐次多项式在射影几何中作为射影簇进行研究。射影几何是数学中一个内容特别丰富的领域;在其最抽象的形式——概型的几何学中,它与弦理论中的各种主题都有联系。
===Fractals===
===Fractals 分形学===
[[File:Kochsim.gif|thumb|right|250px|A [[Koch curve]] is [[self-similar]].|链接=Special:FilePath/Kochsim.gif]]
[[File:Kochsim.gif|thumb|right|250px|A [[Koch curve]] is [[self-similar]].|链接=Special:FilePath/Kochsim.gif]]
It is sometimes said that [[fractal]]s are scale-invariant, although more precisely, one should say that they are [[self-similar]]. A fractal is equal to itself typically for only a discrete set of values {{mvar|λ}}, and even then a translation and rotation may have to be applied to match the fractal up to itself.
It is sometimes said that [[fractal]]s are scale-invariant, although more precisely, one should say that they are [[self-similar]]. A fractal is equal to itself typically for only a discrete set of values {{mvar|λ}}, and even then a translation and rotation may have to be applied to match the fractal up to itself.It is sometimes said that fractals are scale-invariant, although more precisely, one should say that they are self-similar. A fractal is equal to itself typically for only a discrete set of values , and even then a translation and rotation may have to be applied to match the fractal up to itself.
It is sometimes said that fractals are scale-invariant, although more precisely, one should say that they are self-similar. A fractal is equal to itself typically for only a discrete set of values , and even then a translation and rotation may have to be applied to match the fractal up to itself.
有时人们说分形是尺度不变的,尽管更准确地说,我们应该说它们是自相似的。一个分形通常只对一个离散的值集等于它自己,即使在这种情况下,平移和旋转也可能被用来匹配这个分形本身。
有时人们说分形是尺度不变的,尽管更准确地说,我们应该说它们是自相似的。一个分形通常只对一个离散的值集等于它自己,即使在这种情况下,平移和旋转也可能被用来匹配这个分形本身。